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Geometric Series (Edexcel International A Level Maths: Pure 2)
Revision Note
Geometric Series
How do I find the sum of a geometric series?
- A geometric series is the sum of the terms of a geometric sequence
- The following formulae will let you find the sum of the first n terms of a geometric series:
or
-
- a is the first term
- r is the common ratio
- The one on the left is more convenient if r < 1, the one on the right is more convenient if r > 1
- The a and the r in those formulae are exactly the same as the ones used with geometric sequences
How do I prove the geometric series formula?
- Learn this proof of the geometric series formula – you can be asked to give it in the exam:
- Write out the sum once
- Write out the sum again but multiply each term by r
- Subtract the second sum from the first
- All the terms except two should cancel out
- Factorise and rearrange to make S the subject
What is the sum to infinity of a geometric series?
- If (and only if!) |r| < 1, then the geometric series converges to a finite value given by the formula
- S∞ is known as the sum to infinity
- If |r| ≥ 1 the geometric series is divergent and the sum to infinity does not exist
Examiner Tip
- The geometric series formulae are in the formulae booklet – you don't need to memorise them
- You will sometimes need to use logarithms to answer geometric series questions (see Exponential Equations)
Worked example
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